A Set of Convolution Identities Relating the Blocks of Two Dixon Resultant Matrices
Resultants for bivariate polynomials are often represented by the determinants of very big matrices. Properly grouping the entries of these matrices into blocks is a very effective tool for studying the properties of these resultants. Here we derive a set of convolution identities relating the blocks of two Dixon bivariate resultant representations.
Chionh, Eng-Wee, Goldman, Ronald and Zhang, Ming. "A Set of Convolution Identities Relating the Blocks of Two Dixon Resultant Matrices." (1999) https://hdl.handle.net/1911/96508.